Cycles with two blocks in k-chromatic digraphs

Abstract

Let k and be positive integers. A cycle with two blocks c(k,) is an oriented cycle which consists of two internally (vertex) disjoint directed paths of lengths at least k and , respectively, from a vertex to another one. A problem of Addario-Berry, Havet and Thomass\'e (2007) asked if, given positive integers k and such that k+ 4, any strongly connected digraph D containing no c(k,) has chromatic number at most k+-1. In this paper, we show that such digraph D has chromatic number at most O((k+)2), improving the previous upper bound O((k+)4) obtained by Cohen, Havet, Lochet and Nisse (2016). In fact, we are able to find a digraph which shows that the answer to the above problem is no. We also show that if in addition D is Hamiltonian, then its underlying simple graph is (k+-1)-degenerate and thus the chromatic number of D is at most k+, which is tight.